Perverse filtration for generalized Kummer varieties of fibered surfaces
Abstract: Let $A\to C$ be a proper surjective morphism from a smooth connected quasi-projective commutative group scheme of dimension 2 to a smooth curve. The construction of generalized Kummer varieties gives a proper morphism $A{[[n]]}\to C{((n))}$. We show that the perverse filtration associated with this morphism is multiplicative.
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